How challenging did you find Real Analysis before the penny dropped?
I've been following 'Understanding Analysis by Stephen Abbot' and have been struggling with exercise questions even after an in depth read of the chapters. I have read numerous statements by authors that 'if you can't do the exercises, then you haven't grasped the material properly', but I feel like I have grasped the concepts. I've read many 'how to' books to finally understand higher level math and persevered with a 'never giving up' attitude, but most exercises really throw me off. Even those in the first chapter which are meant to be on basic preliminary material.
Is this just the nature of studying Real Analysis? I'll be starting Abstract Algebra soon and have been advised to purchase 'J.B Fraleighs introduction'. Do other higher maths subjects cause the same anxieties as Real Analysis?
soft-question book-recommendation advice
|
show 3 more comments
I've been following 'Understanding Analysis by Stephen Abbot' and have been struggling with exercise questions even after an in depth read of the chapters. I have read numerous statements by authors that 'if you can't do the exercises, then you haven't grasped the material properly', but I feel like I have grasped the concepts. I've read many 'how to' books to finally understand higher level math and persevered with a 'never giving up' attitude, but most exercises really throw me off. Even those in the first chapter which are meant to be on basic preliminary material.
Is this just the nature of studying Real Analysis? I'll be starting Abstract Algebra soon and have been advised to purchase 'J.B Fraleighs introduction'. Do other higher maths subjects cause the same anxieties as Real Analysis?
soft-question book-recommendation advice
Could you give some specific examples of problems that you find difficult?
– Sambo
5 hours ago
It seems what you’re really looking for is commiseration in your time of trouble, which really isn’t a mathematical question. But I’m sure you’d find commiseration in the chatrooms...
– rschwieb
5 hours ago
3
You need to read Rudin. It's the only respectable analysis text, in my honest view. Only by reading baby Rudin (the bible of undergraduate mathematics) will you truly begin to learn analysis.
– MathematicsStudent1122
4 hours ago
1
I've not long started either, but I'd say there's often a difference between grasping concepts and doing exercises—namely that an exercise can often require some useful little trick which isn't mentioned in the material: some algebraic manoeuvre, say. (And the author isn't writing about algebra, so leaves that part to you.)
– timtfj
4 hours ago
3
MathematicsStudent is right, Baby Rudin is a really good place to jump in. Later, you meet Papa Rudin and Grandpa Rudin as well! ;)
– Robert Lewis
4 hours ago
|
show 3 more comments
I've been following 'Understanding Analysis by Stephen Abbot' and have been struggling with exercise questions even after an in depth read of the chapters. I have read numerous statements by authors that 'if you can't do the exercises, then you haven't grasped the material properly', but I feel like I have grasped the concepts. I've read many 'how to' books to finally understand higher level math and persevered with a 'never giving up' attitude, but most exercises really throw me off. Even those in the first chapter which are meant to be on basic preliminary material.
Is this just the nature of studying Real Analysis? I'll be starting Abstract Algebra soon and have been advised to purchase 'J.B Fraleighs introduction'. Do other higher maths subjects cause the same anxieties as Real Analysis?
soft-question book-recommendation advice
I've been following 'Understanding Analysis by Stephen Abbot' and have been struggling with exercise questions even after an in depth read of the chapters. I have read numerous statements by authors that 'if you can't do the exercises, then you haven't grasped the material properly', but I feel like I have grasped the concepts. I've read many 'how to' books to finally understand higher level math and persevered with a 'never giving up' attitude, but most exercises really throw me off. Even those in the first chapter which are meant to be on basic preliminary material.
Is this just the nature of studying Real Analysis? I'll be starting Abstract Algebra soon and have been advised to purchase 'J.B Fraleighs introduction'. Do other higher maths subjects cause the same anxieties as Real Analysis?
soft-question book-recommendation advice
soft-question book-recommendation advice
asked 5 hours ago
user503154
773
773
Could you give some specific examples of problems that you find difficult?
– Sambo
5 hours ago
It seems what you’re really looking for is commiseration in your time of trouble, which really isn’t a mathematical question. But I’m sure you’d find commiseration in the chatrooms...
– rschwieb
5 hours ago
3
You need to read Rudin. It's the only respectable analysis text, in my honest view. Only by reading baby Rudin (the bible of undergraduate mathematics) will you truly begin to learn analysis.
– MathematicsStudent1122
4 hours ago
1
I've not long started either, but I'd say there's often a difference between grasping concepts and doing exercises—namely that an exercise can often require some useful little trick which isn't mentioned in the material: some algebraic manoeuvre, say. (And the author isn't writing about algebra, so leaves that part to you.)
– timtfj
4 hours ago
3
MathematicsStudent is right, Baby Rudin is a really good place to jump in. Later, you meet Papa Rudin and Grandpa Rudin as well! ;)
– Robert Lewis
4 hours ago
|
show 3 more comments
Could you give some specific examples of problems that you find difficult?
– Sambo
5 hours ago
It seems what you’re really looking for is commiseration in your time of trouble, which really isn’t a mathematical question. But I’m sure you’d find commiseration in the chatrooms...
– rschwieb
5 hours ago
3
You need to read Rudin. It's the only respectable analysis text, in my honest view. Only by reading baby Rudin (the bible of undergraduate mathematics) will you truly begin to learn analysis.
– MathematicsStudent1122
4 hours ago
1
I've not long started either, but I'd say there's often a difference between grasping concepts and doing exercises—namely that an exercise can often require some useful little trick which isn't mentioned in the material: some algebraic manoeuvre, say. (And the author isn't writing about algebra, so leaves that part to you.)
– timtfj
4 hours ago
3
MathematicsStudent is right, Baby Rudin is a really good place to jump in. Later, you meet Papa Rudin and Grandpa Rudin as well! ;)
– Robert Lewis
4 hours ago
Could you give some specific examples of problems that you find difficult?
– Sambo
5 hours ago
Could you give some specific examples of problems that you find difficult?
– Sambo
5 hours ago
It seems what you’re really looking for is commiseration in your time of trouble, which really isn’t a mathematical question. But I’m sure you’d find commiseration in the chatrooms...
– rschwieb
5 hours ago
It seems what you’re really looking for is commiseration in your time of trouble, which really isn’t a mathematical question. But I’m sure you’d find commiseration in the chatrooms...
– rschwieb
5 hours ago
3
3
You need to read Rudin. It's the only respectable analysis text, in my honest view. Only by reading baby Rudin (the bible of undergraduate mathematics) will you truly begin to learn analysis.
– MathematicsStudent1122
4 hours ago
You need to read Rudin. It's the only respectable analysis text, in my honest view. Only by reading baby Rudin (the bible of undergraduate mathematics) will you truly begin to learn analysis.
– MathematicsStudent1122
4 hours ago
1
1
I've not long started either, but I'd say there's often a difference between grasping concepts and doing exercises—namely that an exercise can often require some useful little trick which isn't mentioned in the material: some algebraic manoeuvre, say. (And the author isn't writing about algebra, so leaves that part to you.)
– timtfj
4 hours ago
I've not long started either, but I'd say there's often a difference between grasping concepts and doing exercises—namely that an exercise can often require some useful little trick which isn't mentioned in the material: some algebraic manoeuvre, say. (And the author isn't writing about algebra, so leaves that part to you.)
– timtfj
4 hours ago
3
3
MathematicsStudent is right, Baby Rudin is a really good place to jump in. Later, you meet Papa Rudin and Grandpa Rudin as well! ;)
– Robert Lewis
4 hours ago
MathematicsStudent is right, Baby Rudin is a really good place to jump in. Later, you meet Papa Rudin and Grandpa Rudin as well! ;)
– Robert Lewis
4 hours ago
|
show 3 more comments
3 Answers
3
active
oldest
votes
I have two insights I have gleaned from my personal struggle with similar difficulties:
First, if you are having trouble with exercises, find easier exercises on which to cut your teeth. There are always easier exercises. The point is to jump in at a place where you feel comfortable working so you can grow your skills naturally. You may have to switch books to do it, but it can be done. Skill grows inevitably with practice, but I think you have to practice with what you can do. Sometimes baby steps are the wisest way to go. Just my thoughts . . .
Second, in my experience as a student, teacher, and researcher, some people are just naturally better at some subjects than they are at others. I have seen people who could breeze through graduate algebra courses struggle to barely pass analysis or differential equations, and vice versa; and I think putting time in on what you have a natural knack for may contribute to your success in subjects which you find intrinsically more difficult.
I hope these words are helpful. You are not alone.
Just to add to your comment that "people are just naturally better at some subjects than they are at other" there is also the possibility that you might 'naturally' struggle with real analysis, but find topology 'naturally' accessible, which will then make real analysis intuitive. Sometimes pushing through with a bare understanding of the main results and then going back works.
– Bernard W
4 hours ago
@BernardW: yes; I couldn't really grasp Lebesgue integration very well until I learned the essentials of functional analysis. Go figure!
– Robert Lewis
4 hours ago
add a comment |
I would say that the ability to do the exercises is an indication that you have (or are currently) mastering the concepts, but that simply grasping them is a much lower bar.
My personal advice is the following: find some classmates and take turns teaching each other the material. Literally. Go find a study room or somewhere you can stand in front of a board and teach each other what you learned in class. Reprove theorems. Re-examine examples. Re-state definitions (from memory if you can). There is no better way to learn than to teach.
If that doesn't help, then my next bit of advice is to practice 'till you puke. Another answer stated something about easier exercises to cut your teeth; this is an amazing bit of advice. But don't feel compelled to get back up to the hard problems fast! Keep practicing everything, because you never know when it will all click, and what will be the cause of said click.
New contributor
add a comment |
A few bits of advice...
First, draw pictures. Specifically, draw graphs of real-valued functions, and see what various theorems are telling you about these pictures. Draw pictures to help you solve problems, too. Pictures don’t constitute a solution or a proof, but they can often guide you towards the right line of reasoning.
Second, play with lots of examples. Suppose you’re studying a theorem that has several hypotheses. Think of examples where the hypotheses are satisfied and where they are not. If one of the hypotheses is not satisfied, maybe the theorem is no longer true. Think of examples that illustrate this.
Third, don’t expect things to be easy. Mathematics texts (and many teachers) have a nasty habit of showing you only the pretty final results, without showing you all the false starts and roadblocks that preceded them. You won’t be able to write textbook mathematics on your first attempt. The first few attempts will be a mess. Once you have a solution that works, then you can tidy it up and make it look as pretty as the stuff in textbooks.
add a comment |
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3 Answers
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active
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3 Answers
3
active
oldest
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I have two insights I have gleaned from my personal struggle with similar difficulties:
First, if you are having trouble with exercises, find easier exercises on which to cut your teeth. There are always easier exercises. The point is to jump in at a place where you feel comfortable working so you can grow your skills naturally. You may have to switch books to do it, but it can be done. Skill grows inevitably with practice, but I think you have to practice with what you can do. Sometimes baby steps are the wisest way to go. Just my thoughts . . .
Second, in my experience as a student, teacher, and researcher, some people are just naturally better at some subjects than they are at others. I have seen people who could breeze through graduate algebra courses struggle to barely pass analysis or differential equations, and vice versa; and I think putting time in on what you have a natural knack for may contribute to your success in subjects which you find intrinsically more difficult.
I hope these words are helpful. You are not alone.
Just to add to your comment that "people are just naturally better at some subjects than they are at other" there is also the possibility that you might 'naturally' struggle with real analysis, but find topology 'naturally' accessible, which will then make real analysis intuitive. Sometimes pushing through with a bare understanding of the main results and then going back works.
– Bernard W
4 hours ago
@BernardW: yes; I couldn't really grasp Lebesgue integration very well until I learned the essentials of functional analysis. Go figure!
– Robert Lewis
4 hours ago
add a comment |
I have two insights I have gleaned from my personal struggle with similar difficulties:
First, if you are having trouble with exercises, find easier exercises on which to cut your teeth. There are always easier exercises. The point is to jump in at a place where you feel comfortable working so you can grow your skills naturally. You may have to switch books to do it, but it can be done. Skill grows inevitably with practice, but I think you have to practice with what you can do. Sometimes baby steps are the wisest way to go. Just my thoughts . . .
Second, in my experience as a student, teacher, and researcher, some people are just naturally better at some subjects than they are at others. I have seen people who could breeze through graduate algebra courses struggle to barely pass analysis or differential equations, and vice versa; and I think putting time in on what you have a natural knack for may contribute to your success in subjects which you find intrinsically more difficult.
I hope these words are helpful. You are not alone.
Just to add to your comment that "people are just naturally better at some subjects than they are at other" there is also the possibility that you might 'naturally' struggle with real analysis, but find topology 'naturally' accessible, which will then make real analysis intuitive. Sometimes pushing through with a bare understanding of the main results and then going back works.
– Bernard W
4 hours ago
@BernardW: yes; I couldn't really grasp Lebesgue integration very well until I learned the essentials of functional analysis. Go figure!
– Robert Lewis
4 hours ago
add a comment |
I have two insights I have gleaned from my personal struggle with similar difficulties:
First, if you are having trouble with exercises, find easier exercises on which to cut your teeth. There are always easier exercises. The point is to jump in at a place where you feel comfortable working so you can grow your skills naturally. You may have to switch books to do it, but it can be done. Skill grows inevitably with practice, but I think you have to practice with what you can do. Sometimes baby steps are the wisest way to go. Just my thoughts . . .
Second, in my experience as a student, teacher, and researcher, some people are just naturally better at some subjects than they are at others. I have seen people who could breeze through graduate algebra courses struggle to barely pass analysis or differential equations, and vice versa; and I think putting time in on what you have a natural knack for may contribute to your success in subjects which you find intrinsically more difficult.
I hope these words are helpful. You are not alone.
I have two insights I have gleaned from my personal struggle with similar difficulties:
First, if you are having trouble with exercises, find easier exercises on which to cut your teeth. There are always easier exercises. The point is to jump in at a place where you feel comfortable working so you can grow your skills naturally. You may have to switch books to do it, but it can be done. Skill grows inevitably with practice, but I think you have to practice with what you can do. Sometimes baby steps are the wisest way to go. Just my thoughts . . .
Second, in my experience as a student, teacher, and researcher, some people are just naturally better at some subjects than they are at others. I have seen people who could breeze through graduate algebra courses struggle to barely pass analysis or differential equations, and vice versa; and I think putting time in on what you have a natural knack for may contribute to your success in subjects which you find intrinsically more difficult.
I hope these words are helpful. You are not alone.
answered 5 hours ago
Robert Lewis
43.1k22863
43.1k22863
Just to add to your comment that "people are just naturally better at some subjects than they are at other" there is also the possibility that you might 'naturally' struggle with real analysis, but find topology 'naturally' accessible, which will then make real analysis intuitive. Sometimes pushing through with a bare understanding of the main results and then going back works.
– Bernard W
4 hours ago
@BernardW: yes; I couldn't really grasp Lebesgue integration very well until I learned the essentials of functional analysis. Go figure!
– Robert Lewis
4 hours ago
add a comment |
Just to add to your comment that "people are just naturally better at some subjects than they are at other" there is also the possibility that you might 'naturally' struggle with real analysis, but find topology 'naturally' accessible, which will then make real analysis intuitive. Sometimes pushing through with a bare understanding of the main results and then going back works.
– Bernard W
4 hours ago
@BernardW: yes; I couldn't really grasp Lebesgue integration very well until I learned the essentials of functional analysis. Go figure!
– Robert Lewis
4 hours ago
Just to add to your comment that "people are just naturally better at some subjects than they are at other" there is also the possibility that you might 'naturally' struggle with real analysis, but find topology 'naturally' accessible, which will then make real analysis intuitive. Sometimes pushing through with a bare understanding of the main results and then going back works.
– Bernard W
4 hours ago
Just to add to your comment that "people are just naturally better at some subjects than they are at other" there is also the possibility that you might 'naturally' struggle with real analysis, but find topology 'naturally' accessible, which will then make real analysis intuitive. Sometimes pushing through with a bare understanding of the main results and then going back works.
– Bernard W
4 hours ago
@BernardW: yes; I couldn't really grasp Lebesgue integration very well until I learned the essentials of functional analysis. Go figure!
– Robert Lewis
4 hours ago
@BernardW: yes; I couldn't really grasp Lebesgue integration very well until I learned the essentials of functional analysis. Go figure!
– Robert Lewis
4 hours ago
add a comment |
I would say that the ability to do the exercises is an indication that you have (or are currently) mastering the concepts, but that simply grasping them is a much lower bar.
My personal advice is the following: find some classmates and take turns teaching each other the material. Literally. Go find a study room or somewhere you can stand in front of a board and teach each other what you learned in class. Reprove theorems. Re-examine examples. Re-state definitions (from memory if you can). There is no better way to learn than to teach.
If that doesn't help, then my next bit of advice is to practice 'till you puke. Another answer stated something about easier exercises to cut your teeth; this is an amazing bit of advice. But don't feel compelled to get back up to the hard problems fast! Keep practicing everything, because you never know when it will all click, and what will be the cause of said click.
New contributor
add a comment |
I would say that the ability to do the exercises is an indication that you have (or are currently) mastering the concepts, but that simply grasping them is a much lower bar.
My personal advice is the following: find some classmates and take turns teaching each other the material. Literally. Go find a study room or somewhere you can stand in front of a board and teach each other what you learned in class. Reprove theorems. Re-examine examples. Re-state definitions (from memory if you can). There is no better way to learn than to teach.
If that doesn't help, then my next bit of advice is to practice 'till you puke. Another answer stated something about easier exercises to cut your teeth; this is an amazing bit of advice. But don't feel compelled to get back up to the hard problems fast! Keep practicing everything, because you never know when it will all click, and what will be the cause of said click.
New contributor
add a comment |
I would say that the ability to do the exercises is an indication that you have (or are currently) mastering the concepts, but that simply grasping them is a much lower bar.
My personal advice is the following: find some classmates and take turns teaching each other the material. Literally. Go find a study room or somewhere you can stand in front of a board and teach each other what you learned in class. Reprove theorems. Re-examine examples. Re-state definitions (from memory if you can). There is no better way to learn than to teach.
If that doesn't help, then my next bit of advice is to practice 'till you puke. Another answer stated something about easier exercises to cut your teeth; this is an amazing bit of advice. But don't feel compelled to get back up to the hard problems fast! Keep practicing everything, because you never know when it will all click, and what will be the cause of said click.
New contributor
I would say that the ability to do the exercises is an indication that you have (or are currently) mastering the concepts, but that simply grasping them is a much lower bar.
My personal advice is the following: find some classmates and take turns teaching each other the material. Literally. Go find a study room or somewhere you can stand in front of a board and teach each other what you learned in class. Reprove theorems. Re-examine examples. Re-state definitions (from memory if you can). There is no better way to learn than to teach.
If that doesn't help, then my next bit of advice is to practice 'till you puke. Another answer stated something about easier exercises to cut your teeth; this is an amazing bit of advice. But don't feel compelled to get back up to the hard problems fast! Keep practicing everything, because you never know when it will all click, and what will be the cause of said click.
New contributor
New contributor
answered 4 hours ago
DeficientMathDude
1012
1012
New contributor
New contributor
add a comment |
add a comment |
A few bits of advice...
First, draw pictures. Specifically, draw graphs of real-valued functions, and see what various theorems are telling you about these pictures. Draw pictures to help you solve problems, too. Pictures don’t constitute a solution or a proof, but they can often guide you towards the right line of reasoning.
Second, play with lots of examples. Suppose you’re studying a theorem that has several hypotheses. Think of examples where the hypotheses are satisfied and where they are not. If one of the hypotheses is not satisfied, maybe the theorem is no longer true. Think of examples that illustrate this.
Third, don’t expect things to be easy. Mathematics texts (and many teachers) have a nasty habit of showing you only the pretty final results, without showing you all the false starts and roadblocks that preceded them. You won’t be able to write textbook mathematics on your first attempt. The first few attempts will be a mess. Once you have a solution that works, then you can tidy it up and make it look as pretty as the stuff in textbooks.
add a comment |
A few bits of advice...
First, draw pictures. Specifically, draw graphs of real-valued functions, and see what various theorems are telling you about these pictures. Draw pictures to help you solve problems, too. Pictures don’t constitute a solution or a proof, but they can often guide you towards the right line of reasoning.
Second, play with lots of examples. Suppose you’re studying a theorem that has several hypotheses. Think of examples where the hypotheses are satisfied and where they are not. If one of the hypotheses is not satisfied, maybe the theorem is no longer true. Think of examples that illustrate this.
Third, don’t expect things to be easy. Mathematics texts (and many teachers) have a nasty habit of showing you only the pretty final results, without showing you all the false starts and roadblocks that preceded them. You won’t be able to write textbook mathematics on your first attempt. The first few attempts will be a mess. Once you have a solution that works, then you can tidy it up and make it look as pretty as the stuff in textbooks.
add a comment |
A few bits of advice...
First, draw pictures. Specifically, draw graphs of real-valued functions, and see what various theorems are telling you about these pictures. Draw pictures to help you solve problems, too. Pictures don’t constitute a solution or a proof, but they can often guide you towards the right line of reasoning.
Second, play with lots of examples. Suppose you’re studying a theorem that has several hypotheses. Think of examples where the hypotheses are satisfied and where they are not. If one of the hypotheses is not satisfied, maybe the theorem is no longer true. Think of examples that illustrate this.
Third, don’t expect things to be easy. Mathematics texts (and many teachers) have a nasty habit of showing you only the pretty final results, without showing you all the false starts and roadblocks that preceded them. You won’t be able to write textbook mathematics on your first attempt. The first few attempts will be a mess. Once you have a solution that works, then you can tidy it up and make it look as pretty as the stuff in textbooks.
A few bits of advice...
First, draw pictures. Specifically, draw graphs of real-valued functions, and see what various theorems are telling you about these pictures. Draw pictures to help you solve problems, too. Pictures don’t constitute a solution or a proof, but they can often guide you towards the right line of reasoning.
Second, play with lots of examples. Suppose you’re studying a theorem that has several hypotheses. Think of examples where the hypotheses are satisfied and where they are not. If one of the hypotheses is not satisfied, maybe the theorem is no longer true. Think of examples that illustrate this.
Third, don’t expect things to be easy. Mathematics texts (and many teachers) have a nasty habit of showing you only the pretty final results, without showing you all the false starts and roadblocks that preceded them. You won’t be able to write textbook mathematics on your first attempt. The first few attempts will be a mess. Once you have a solution that works, then you can tidy it up and make it look as pretty as the stuff in textbooks.
answered 14 mins ago
bubba
29.9k32986
29.9k32986
add a comment |
add a comment |
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Could you give some specific examples of problems that you find difficult?
– Sambo
5 hours ago
It seems what you’re really looking for is commiseration in your time of trouble, which really isn’t a mathematical question. But I’m sure you’d find commiseration in the chatrooms...
– rschwieb
5 hours ago
3
You need to read Rudin. It's the only respectable analysis text, in my honest view. Only by reading baby Rudin (the bible of undergraduate mathematics) will you truly begin to learn analysis.
– MathematicsStudent1122
4 hours ago
1
I've not long started either, but I'd say there's often a difference between grasping concepts and doing exercises—namely that an exercise can often require some useful little trick which isn't mentioned in the material: some algebraic manoeuvre, say. (And the author isn't writing about algebra, so leaves that part to you.)
– timtfj
4 hours ago
3
MathematicsStudent is right, Baby Rudin is a really good place to jump in. Later, you meet Papa Rudin and Grandpa Rudin as well! ;)
– Robert Lewis
4 hours ago